Conic Sections and Their Properties

Hyperbolas and circles

Parabolas and ellipses

Ellipses and hyperbolas

Circles and parabolas

b² = a² + e²

b² = a²(1 + e²)

b² = a² - e²

b² = a²(1 - e²)

The area of the conic section

The angle between the axes

The ratio of the distances from a point on the conic to the foci and directrix

The distance between the foci

(±e, ±a)

(±ae, 0)

(0, ±ae)

(±a, ±e)

They are always at the origin

They do not exist

They represent a change in behavior

They are the same as in an ellipse

Asymptotes

Vertices

Directrices

Foci

They are the points of maximum curvature

They are the turning points of the hyperbola

They are the endpoints of the major axis

They are the points where the hyperbola intersects the axes

Finding the foci

Solving for y²

Determining the directrices

Calculating the eccentricity

y = ±x/a

y = ±x/b

y = ±a/b x

y = ±b/a x

Because it cancels out

Because it is irrelevant in this context

Because the plus or minus sign accounts for it

Because the values are always positive